第一次差不多算自己推出来的吧,代码也写出来了。
但是块的右边界写错了,真有我的.jpg。
看了一眼题,我就得出了$ans = sum_{i = 1}^{n}sum_{j = 1}^{m} i * j / gcd(i,j)$
然后就开始愉快(bushi)地推式子了。
$ans = sum_{i = 1}^{n}sum_{j = 1}^{m}sum_{d = 1}^{min(n,m)}i * j / d * |~d~|~gcd(frac{i}{d},frac{j}{d})~| = sum_{d = 1}^{min(n,m)}sum_{i = 1}^{[frac{n}{d}]}sum_{j = 1}^{[frac{m}{d}]}(id) * (jd) / d * |t | gcd(i,j) = 1|$
$ = sum_{d = 1}^{min(n,m)}sum_{i = 1}^{[frac{n}{d}]}sum_{j = 1}^{[frac{m}{d}]}i * j * d * sum_{t | gcd(i,j)}^{} mu (t)$
$ = sum_{d = 1}^{min(n,m)} d sum_{t = 1}^{min(n / d,m /d))} mu (t) sum_{i = 1}^{[frac{n}{dt}]}sum_{j = 1}^{[frac{m}{dt}]}it * jt$
$ = sum_{d = 1}^{min(n,m)} d sum_{t = 1}^{min(n / d,m /d))} mu (t) * t^{2}sum_{i = 1}^{[frac{n}{dt}]}i sum_{j = 1}^{[frac{m}{dt}]}j$
后面的式子显然可以整除分块处理,然后也要预处理一下关于t的项。
然后一开始想的枚举d,但是这样肯定超时,后面仔细看后面的上限是n / d,m / d,那么可以再套一个整除分块。
这样的话就是最高复杂度也就是预处理:O(max(n,m))。
细节就是与取模要防负数。
#include<bits/stdc++.h> using namespace std; typedef long long LL; typedef pair<int,int> pii; const int N = 1e7+5; const int M = 1e7+5; const LL Mod = 20101009; #define pi acos(-1) #define INF 1e9 #define CT0 cin.tie(0),cout.tie(0) #define IO ios::sync_with_stdio(false) #define dbg(ax) cout << "now this num is " << ax << endl; namespace FASTIO{ inline int read() { int x = 0,f = 1;char c = getchar(); while(c < '0' || c > '9'){if(c == '-')f = -1;c = getchar();} while(c >= '0' && c <= '9'){x = (x << 1) + (x << 3) + (c ^ 48);c = getchar();} return x * f; } void print(int x){ if(x < 0){x = -x;putchar('-');} if(x > 9) print(x/10); putchar(x%10+'0'); } } using namespace FASTIO; bool vis[N]; int mu[N],prime[N],tot = 0; LL sum[N],f[N]; void init() { mu[1] = 1; for(int i = 2;i < N;++i) { if(!vis[i]) { prime[++tot] = i; mu[i] = -1; } for(int j = 1;j <= tot && i * prime[j] < N;++j) { vis[i * prime[j]] = 1; if(i % prime[j] == 0) break; else mu[i * prime[j]] = -mu[i]; } } for(int i = 1;i < N;++i) sum[i] = (sum[i - 1] + (mu[i] * ((1LL * i * i) % Mod) % Mod) + Mod) % Mod; for(int i = 1;i < N;++i) f[i] = (f[i - 1] + i) % Mod; } LL solve(int x,int y) { LL ans = 0; for(int L = 1,r = 0;L <= min(x,y);L = r + 1) { r = min(x / (x / L),y / (y / L)); ans = (ans + ((sum[r] - sum[L - 1]) % Mod + Mod) % Mod * f[x / L] % Mod * f[y / L] % Mod) %Mod; } return ans; } int main() { init(); int n,m;n = read(),m = read(); LL ans = 0; for(int L = 1,r = 0;L <= min(n,m);L = r + 1) { r = min(n / (n / L),m / (m / L)); LL ma = solve(n / L,m / L); ans = (ans + ((f[r] - f[L - 1]) %Mod + Mod) % Mod * ma % Mod) % Mod; } printf("%lld ",ans); system("pause"); return 0; }